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Evaluate the indefinite integrals in Exercises
Chapter 5, Problem 13E(choose chapter or problem)
Evaluate the indefinite integrals in Exercises 1–16 by using the given substitutions to reduce the integrals to standard form.
\(\int \sqrt{x} \sin ^{2}\left(x^{3 / 2}-1\right) d x, u=x^{3 / 2}-\frac{1}{x}\)
Text Transcription:
Text Transcription:
integral sqrt x sin^2 (x^3/2 - 1) dx, u = x^3/2 -1/x
Questions & Answers
QUESTION:
Evaluate the indefinite integrals in Exercises 1–16 by using the given substitutions to reduce the integrals to standard form.
\(\int \sqrt{x} \sin ^{2}\left(x^{3 / 2}-1\right) d x, u=x^{3 / 2}-\frac{1}{x}\)
Text Transcription:
Text Transcription:
integral sqrt x sin^2 (x^3/2 - 1) dx, u = x^3/2 -1/x
ANSWER:SOLUTION
Step 1 of 3
Here, we have to evaluate the given integrals using the given substitutions.
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